Abstract
A Menon difference set has the parameters (4N2,2N2-N, N2-N). In the abelian case it is equivalent to a perfect binary array, which is a multi-dimensional matrix with elements ±1 such that all out-of-phase periodic autocorrelation coefficients are zero. Suppose that the abelian group\(H \times K \times Z_{p^\alpha }\) contains a Menon difference set, wherep is an odd prime, |K|=pα, andpj≡−1 (mod exp (H)) for somej. Using the viewpoint of perfect binary arrays we prove thatK must be cyclic. A corollary is that there exists a Menon difference set in the abelian group\(H \times K \times Z_{3^\alpha }\), where exp(H)=2 or 4 and |K|=3α, if and only ifK is cyclic.
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